International Mathematics Competition
for University Students
2020

IMC2020: Day 1, Problem 2

Problem 2. Let \(\displaystyle A\) and \(\displaystyle B\) be \(\displaystyle n\times n\) real matrices such that

\(\displaystyle \textrm{rk}(AB-BA+I)=1 \)

where \(\displaystyle I\) is the \(\displaystyle n\times n\) identity matrix.

Prove that

\(\displaystyle \tr(ABAB)-\tr(A^2B^2)=\frac12 n(n-1). \)

(\(\displaystyle \textrm{rk}(M)\) denotes the rank of matrix \(\displaystyle M\), i.e., the maximum number of linearly independent columns in \(\displaystyle M\). \(\displaystyle \tr(M)\) denotes the trace of \(\displaystyle M\), that is the sum of diagonal elements in \(\displaystyle M\).)

Rustam Turdibaev, V. I. Romanovskiy Institute of Mathematics

  Hint    Solution